Two‐person games for uncertain random singular dynamic systems
Xin Chen, Yuanguo Zhu, Ju H. Park
Abstract
Abstract A complex system exhibiting uncertainty as well as randomness may be portrayed by an uncertain random singular difference equation. This paper investigates two‐person nonzero‐sum and zero‐sum games based on uncertain random singular difference equations. First, an approach is proposed to translate the two‐person nonzero‐sum game into an equivalent game for a standard uncertain random dynamic system. The relevant recursive equations are developed to search the Nash equilibrium for the converted game. Solving the related recursive equations yields the solution to such a game. Following that, a Max‐Min Theorem is provided for finding the saddle‐point equilibrium of an uncertain random two‐person zero‐sum game. Finally, a numerical example is offered to demonstrate the validity of the findings.